If `6a^2+12b^2+2c^2+17ab-10bc-7ac=0` then all the lines represented by ax+by+c=0 are concureent at the point

If a:b: c=1:2:3 then the lines represented by ax^(2)+bxy+cy^(2)=0 are

If 6a^2-3b^2-c^2+7ab-ac+4bc-0 , then the family of lines ax+by+c=0 is concurrent at

If 4a^2+9b^2_c^2+12ab=0 then the family of straight lines ax+by+c=0 is concurrent at

Statement I: The points (a,0),(0,b) and (1,1) will be collinear if 1/a+1/b=1 Statement II: If 4a^(2)+9b^(2)-c^(2)+12ab=0 , then the family of lines ax+by+c=0 is either concurrent at (2,3) or at (-2,-3). Then which of the followng is true

If 4a^(2)+9b^(2)-c^(2)+12ab=0 , then the set of lines ax + by+c = 0 pass through the fixed point

If 3a+2b+4c=0 then the lines ax+by+c=0 pass through the fixed point

If the slope of one of the lines represented by ax^(2) + 2hxy + by^(2) = 0 is the square of the other, then (a+b)/h+(8h^(2))/(ab)

If 4a^(2)+9b^(2)-c^(2)+12ab=0 , then the set of lines ax+by+c=0 pass through the fixed point